Digital gaussian noise simulator

ABSTRACT

A Gaussian noise is simulated by discrete analogue r i,j . A first parameter α and pluralities of first and second integers i and j are selected. A plurality of points i,j are identified and a magnitude s i,j  is calculated for each point based on α, i and j. The discrete analogue r i,j  is based on a respective s i,j . Examples are given of 
             α   =         2   B     -   A       2   B             
and D&gt;i≧0 and 2 c &gt;j≧0, where B≧0, 2 B &gt;A&gt;0, C≧1 and D≧1, and magnitude
 
               s     i   ,   j       =       1   -     α   i     +         α   i     ·       1   -   α       2   C       ·   j     ⁢           ⁢   or   ⁢           ⁢     s       D   -   1     ,   j           =     1   -     α     D   -   1       +       α     D   -   1       ·     1     2   C       ·     j   .                 
In some embodiments, a segment is defined based on α and i. The segment is divided into points based on respective values of j, and the magnitude is calculated for each point of the segment. The defining and dividing segments and calculating the magnitude is iteratively repeated for each value of i.

FIELD OF THE INVENTION

This invention is related to hardware simulation of Gaussian noise, particularly for encoding/decoding in digital communication systems.

BACKGROUND OF THE INVENTION

Gaussian noise generators are employed in a wide variety of applications, including circuit design and testing. For example, one step in the design of semiconductor chips for digital communications systems is the simulation of the encoding/decoding circuits of the system. The physical communications system includes a transport channel to transport encoded information between the encoder and decoder circuits. The transport channel, which may be any type of communications channel, introduces Gaussian noise into the information being transmitted. As a result, the decoder receives a digital signal that represents the encoded digital signal and noise.

FIG. 1 illustrates a basic digital communication system comprising an information source 10, encoder 12, transport channel 14 and decoder 16. Information source 10 generates messages containing information to be transmitted. Encoder 12 converts the message into a sequence of bits in the form of a digital signal S that can be transmitted over transport channel 14. During the transmission over transport channel 14 the original signal S is subjected to noise. Decoder 16 receives a signal S′ which represents the original signal S and the noise n_(S), S′=S+n_(S), where n_(S) is a Gaussian noise with zero mean and variance σ².

One approach to simulation of encoder/decoder hardware does not address Gaussian noise at all. Instead, the actual physical transport channel is used to quantify the noise without performing a hardware evaluation of the Gaussian random variable. Another approach, useful for various types of noise, creates a pseudo-random Gaussian noise generator using an inverse function. Examples of pseudo-random Gaussian noise generators are described in U.S. Pat. Nos. 3,885,139 and 4,218,749.

One basic pseudo-random generator U_(k) is a logical circuit having k outputs, where k=1, 2, 3, . . . . On each clock cycle generator U_(k) generates some integer value at its outputs. The output value can be one of 0, 1, . . . , 2^(k)−1, and the probability P that the output will be any given one of these values is constant and is equal to 2^(−k). For example, for any given clock cycle, the probability that generator U_(k) will provide an output having an integer value I is P(I)=2^(−k), where 0≦I≦2^(k)−1.

SUMMARY OF THE INVENTION

One embodiment of the present invention is a process of simulating noise, such as a Gaussian noise, based on a random variable. A first parameter α and pluralities of first and second integers i and j are selected. In one example, parameters A, B, C and D are selected as B≧0, 2^(B)>A>0, C≧1 and D≧1. α is calculated as

${\alpha = \frac{2^{B} - A}{2^{B}}},$ where 1>α>0. Integers i and j are selected such that D>i≧0 and 2^(C)>j≧0. A magnitude for each of a plurality of points s_(i,j) is calculated based on α, i and j. A discrete analogue r_(i,j) of a random variable is based on a respective s_(i,j).

In preferred embodiments, s_(i,j) is calculated as

$s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot j}}$ for each value of i between D−2 and 0, and as

$s_{{D - 1},j} = {1 - \alpha^{D - 1} + {\alpha^{D - 1} \cdot \frac{1}{2^{C}} \cdot j}}$ for i=D−1.

In some embodiments, a segment is defined based on α and a value of i. The segment is divided into points based on respective values of j. The magnitude of each point is calculated, and the process of defining and dividing segments and calculating the magnitude is iteratively repeated for each additional value of i.

In another embodiment, a circuit simulates a noise based on a random variable, such as a Gaussian noise. Each of a plurality of first generators generates a plurality of discrete values. A plurality of comparators, each coupled to a respective one of the first generators, compare the discrete values to a predetermined value, such as A. Each comparator provides an output representative of whether the discrete value from the respective first generator is smaller than A. A selector is responsive to a selected output of a comparator to supply the first integer value i. A second generator generates a second plurality of discrete values j. A memory is responsive to the value of i and respective ones of j to provide an analogue of the random variable.

In preferred embodiments, a third generator generates a sign bit which is combined to the analogue.

In yet other embodiments, a computer program contains computer readable code that causes a computer to perform the process.

BRIEF DESCRIPTION OF THE DRAWINGS

FIG. 1 is a block diagram of a typical digital communications system.

FIG. 2 is a flowchart of a process of creating an integrated circuit of a noise generator in accordance with an embodiment of the present invention.

FIG. 3 is a block diagram of an integrated circuit implementing a noise generator according to one embodiment of the invention.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

The present invention is directed to a process and apparatus for hardware simulation of Gaussian noise n_(S).

It will be appreciated that if n is a Gaussian noise with zero mean and variance 1, a Gaussian noise n_(S) with zero mean and variance σ² can be created as n_(S)=σ·n. For any given value x, the probability that n is smaller than x is denoted by P(n<x) and is

${P\left( {n < x} \right)} = {\frac{1}{\sqrt{2\pi}}{\int_{- \infty}^{x}{{\mathbb{e}}^{- t^{2/2}}{{\mathbb{d}t}.}}}}$

In accordance with the present invention, Gaussian noise n is simulated by evaluating members of the set of Gaussian noise as

${n} = \left\{ {\begin{matrix} n & {n \geq 0} \\ {- n} & {n < 0} \end{matrix},} \right.$ and evaluating the sign s_(n) of n as

$s_{n} = \left\{ {\begin{matrix} 1 & {n \geq 0} \\ {- 1} & {n < 0} \end{matrix}.} \right.$ Then, n=s_(n)·|n|.

Prior pseudo-random generators calculated a pseudo-random approximation of variable |n| using an inverse function. For any given x≧0, the probability that |n| is smaller than x is

${P\left( {{n} < x} \right)} = {\sqrt{\frac{2}{\pi}} \cdot {\int_{0}^{x}{{\mathbb{e}}^{- t^{2/2}}{{\mathbb{d}t}.}}}}$ The present invention evaluates a discrete analogue r of the Gaussian noise |n|. Thus, instead of random variable |n|, the discrete analogue (or discrete approximation) r of the random variable |n| is considered. More particularly, a uniform random variable s is selected that belongs to the interval (0, 1). The value of s varies logarithmically over the interval, rather than linearly so that the value of neighboring points change exponentially. The inverse function may then be applied to the values of each point. FIG. 2 is a flow diagram illustrating the steps of the process of simulating Gaussian noise according to the present invention.

At step 20, values of p and q are selected. The analogue r being calculated is a pseudo-random variable that is analogous to |n| and can take values of

$\frac{k}{2^{q}},$ where k=0, 1, . . . , 2^(p+q)−1. For k=0, 1, . . . , 2^(p+q)−2, the probability that the value of r is a given one of the values

${\frac{k}{2^{q}}\mspace{14mu}{is}\mspace{14mu}{P\left( {r = \frac{k}{2^{q}}} \right)}} = {\sqrt{\frac{2}{\pi}} \cdot {\int_{k/2^{q}}^{{({k + 1})}/2^{q}}{{\mathbb{e}}^{{- t^{2}}/2^{q}}\ {{\mathbb{d}t}.}}}}$ For k=2^(p+q)−1, the probability that r is a given one of the values

${\frac{k}{2^{q}}\mspace{14mu}{is}\mspace{14mu}{P\left( {r = \frac{2^{p + q} - 1}{2^{q}}} \right)}} = {1 - {\sum\limits_{k = 0}^{2^{p + q} - 2}\;{{P\left( {r = \frac{k}{2^{q}}} \right)}.}}}$

In selecting values for p and q, the value p is chosen so that the probability P(|n|>2^(p)) is close to zero. In most cases, p=3, 4 or 5, so the probability is nearly zero that |n| exceeds 8 (where p=3), 16 (where p=4) or 32 (where p=5). The value of q is chosen as large as practical, and is limited by the size of the binary word forming

$\frac{k}{2^{q}}$ and the capacity of the memory created by the hardware implementation of the process. The magnitude

$\frac{1}{2^{q}}$ is an expression of the accuracy of approximation, or difference, of variable r to random variable |n|. As q increases in value, the variance represented by

$\frac{1}{2^{q}}$ decreases in value and variable r more closely approximates random variable |n|. The values

$\frac{k}{2^{q}},{k = 0},1,\;\ldots\mspace{11mu},{2^{p + q} - 1},$ are expressed by (p+q) binary digits k₀, k₁, . . . , k_(p+q)−1 so that

$\frac{k}{2^{q}} = {\frac{1}{2^{q}} \cdot {\sum\limits_{i = 0}^{p + q - 1}\;{2^{i} \cdot {k_{i}.}}}}$

At step 22, four parameters, A, B, C and D, are selected. Parameter B is a positive value, B≧0, parameter A is a positive value between 2^(B) and zero, 2^(B)>A>0, and parameters C and D are positive values greater than 0, C≧1 and D≧1. At step 24, α is calculated as

$\alpha = {\frac{2^{B} - A}{2^{B}}.}$ Thus, 1>α>0. At step 26, integers i and j are selected such that D>i≧0 and 2^(C)>j≧0. At step 28, for each value of i smaller than D−1 (i.e., (D−1)>i≧0) segment [1−α^(i), 1−α^(i+1)] is split into 2^(C) smaller segments, each based on a value of j, and a magnitude s_(i,j) is calculated for each smaller segment as

$s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot {j.}}}$ Each smaller segment has a length equal to

$\alpha^{i}{\frac{1 - \alpha}{2^{C}}.}$

For example, for i=0, points s_(0,j) split segment [0,1−α] into 2^(C) smaller segments each having equal length

$\frac{1 - \alpha}{2^{C}}.$ Each point between 0 and (1−α) has a value

${s_{0,j} = {\frac{1 - \alpha}{2^{C}} \cdot j}},$ where 2^(C)>j≧0. For i=1, and points s_(1,j) split segment [1−α, 1−α²] into 2^(C) smaller segments of equal length

$\alpha\;{\frac{1 - \alpha}{2^{C}}.}$ Each point between (1−α) and (1−α²) has a value

$s_{1,j} = {1 - \alpha + {\alpha \cdot \frac{1 - \alpha}{2^{C}} \cdot {j.}}}$ For i=D−2, points s_((D−2),j) split segment [1−α^(D−2), 1−α^(D−1)] into 2^(C) smaller segments of equal length

${\alpha^{D - 2} \cdot \frac{1 - \alpha}{2^{C}}},$ each having a value

$s_{{D - 2},j} = {1 - \alpha^{D - 2} + {\alpha^{D - 2} \cdot \frac{1 - \alpha}{2^{C}} \cdot j}}$

In the case of i=D−1, segment [1−α^(D−1), 1] is also split into 2^(C) smaller segments, each based on a value of j, and a magnitude S_(D−1,j) is calculated for each smaller segment as

$s_{{D - 1},j} = {1 - \alpha^{D - 1} + {\alpha^{D - 1} \cdot \frac{1}{2^{C}} \cdot {j.}}}$ Each smaller segment has a length equal to

$\alpha^{D - 1}{\frac{1}{2^{C}}.}$

It will be appreciated that the segments together embrace an interval (0, 1), and that the length of neighboring segments exponentially decreases. For example, if α=0.5, segment [0, 1−α] embraces a length of 0.5 of the interval and is divided into 2^(C) smaller segments; segment [1−α, 1−α²] has a length of 0.25 which is also divided into 2^(C) smaller segments; etc. Since each smaller segment has a value s_(i,j), it is evident that the distance between neighboring points s_(i,j) decreases exponentially across the interval (0, 1) as the segments decrease in length. Thus, instead of using uniform distances between points to calculate inverse functions, as in prior noise simulators, the present invention employs exponentially varying distances between points.

At step 30, an inverse function inv(s_(i,j)) is calculated for each magnitude s_(i,j) such that the probability that inv(s_(i,j)) is smaller than |n| is equal to s_(i,j), P(|n |<inv(s_(i,j)))=s_(i,j). Expressed another way,

$s_{i,j} = {\sqrt{\frac{2}{\pi}} \cdot {\int_{0}^{{inv}{(s_{i,j})}}{{\mathbb{e}}^{{- t^{2}}/2}{{\mathbb{d}t}.}}}}$ The number r is selected as the nearest number to inv(s). Therefore, each r_(i,j) is a number closest to the corresponding inv(s_(i,j)) and is member of the set of

$\frac{k}{2^{q}}$ for all values of

${k = 0},1,\ldots\mspace{11mu},\begin{matrix} {2^{p + q} - 1.} & {r_{i,j} \in {\left\{ {{\left. \frac{k}{2^{q}} \middle| k \right. = 0},1,\ldots\mspace{11mu},{2^{p + q} - 1}} \right\}.}} \end{matrix}$

At step 32 a memory is constructed. In one form, the memory may comprise a module MEM comprises a table that stores all the values r_(i,j), for D>i≧0 and 2^(C)>j≧0. Module MEM will require (p+q) bits to store each variable r_(i,j), so the total capacity of memory MEM is D·2^(C)·(p+q) bits. In other embodiments, the memory constructed at step 32 is a logical module LOG_MEM having two inputs i,j to calculate the magnitude r_(i,j) by executing steps 28 and 30 using the i and j input values.

It will be appreciated that in either case the constructed memory will have fixed values of parameters A, B, C and D, thus fixing the binary sizes of i and j and the value of α. Consequently, a memory module MEM may comprise a lookup table correlating values of r_(i,j) to inputs i and j. A memory module LOG_MEM may store fixed values of α and

$\frac{1 - \alpha}{2^{C}},$ and calculate s_(i,j) based on inputs i and j and the stored values of α and

$\frac{1 - \alpha}{2^{C}}.$ Such a LOG_MEM would correlate the calculated s_(i,j) to discrete values of r_(i,j).

At step 34, an integrated circuit is created to generate a pseudo-random Gaussian noise. The circuit is illustrated in FIG. 3, and comprises (D−1) U_(B) generators 40 each generating a respective variable x_(i) representing one of x₀, x₁, . . . , x_(D−2) and having a uniformly-distributed pseudo-random value 0, 1, . . . , 2^(B)−1. The circuit also includes (D−1) comparators 42 that compares the value of x_(i) to A. The value of the output y_(i) of a comparator 42 is logical 1 if and only if the value of the input x_(i) is less than A.

Logical selector 44 has D inputs, designated y₀, y₁, . . . , y_(D−1). Inputs y₀, y₁, . . . , y_(D−2) are supplied by respective comparators 42. The value of the input y_(D−1) is set to logical 1. Selector 44 calculates value i based on the minimum y_(i)=1. For example, if y₀ and y₁ both equal 0 and y₂=1, i is integer 2 and is represented by a logical 1 at the y₂ input. Thus, if D=16, selector will supply a 4-bit representation of i, so for i=2, selector 44 will supply “0100” to memory 46.

The value of i is supplied to the memory 46 created at step 32 (FIG. 2). U_(C) generator 48 generates a value j as 2^(C)<j≦0 and supplies that value to memory 46. For example, if C=12, generator. 48 supplies a 12-bit representation of j. Memory 46 selects or calculates a value of r_(i,j) based on the values of i and j, and supplies the selected r_(i,j) to sign module 50. More particularly, if memory 46 is a table (e.g., MEM) that correlates values of i and j to r_(i,j), the value of r_(i,j) is selected and output to sign module 50. If memory 46 is a logical module (e.g., LOG_MEM), memory 46 contains logic that defines and splits segments into 2^(C) smaller segments, calculates s_(i,j) for each smaller segment, and calculates r_(i,j) as a number closest to the corresponding inv(s_(i,j)), as described in connection with steps 28 and 30 in FIG. 2.

U₁ Generator 52 supplies a 0 or 1 bit to module 50 to select a sign, positive or negative, to value r_(i,j). The sign s_(n) is evaluated as (−1)^(u) ₁ , where u₁ is a pseudo-random variable generated by pseudo-random generator 52 that provides values 0 and 1 with a probability of 0.5 (that is, the probability, P(u₁), that generator 52 will provide a given value 0 or 1 is 0.5). For example, the value of value r_(i,j) is multiplied by −1 if generator 52 supplies a 0 bit. Thus, variable r is generated by the integrated circuit of FIG. 3 for the pseudo-random Gaussian noise.

The selection of the values of parameters A, B, C and D is based on the characteristics (area, delay, etc.) of the integrated circuit in which the noise generator is implemented. Generally, greater values of B, C and D and smaller values of A increases the accuracy of approximation of the Gaussian random variable by the discrete analogue r. Generally, preferred choices of parameter values are:

-   -   1) C≧q;

$\begin{matrix} {{\frac{\alpha^{D - 1}}{2^{C}} \leq \frac{{\mathbb{e}}^{- 2^{{2p} - 1}}}{2^{q}}},{{{where}\mspace{14mu}\alpha} = {\frac{2^{B} - A}{2^{B}}.}}} & \left. 2 \right) \end{matrix}$ For example, for p=3 and q=10, optimal results are achieved by choosing parameters as A=B=1, D=16 and C varies between 10 and 12.

In preferred embodiments the process of the invention is carried out in a computer under the control of a computer program having computer readable program code for causing the computer to carry out the process steps. A memory medium, such as a recording disk of a disk drive, has the computer readable program therein to receive the i and j inputs and define or contain the parameters to carry out the computer processes of the invention.

Although the present invention has been described with reference to preferred embodiments, workers skilled in the art will recognize that changes may be made in form and detail without departing from the spirit and scope of the invention. 

1. A process of simulating noise based on a random variable, the process comprising: defining a plurality of points over an interval, each two neighboring points being separated by a distance that varies over the interval, wherein the points are defined by selecting a first parameter α, a second parameter having a value A and a third parameter having a value B, wherein B≧0 and 2^(B)>A>0, and wherein selecting the first parameter comprises calculating ${\alpha = \frac{2^{B} - A}{2^{B}}},$ selecting a plurality of first integers i, each first integer being uniquely distinct from each other first integer, defining a plurality of segments based on α to powers of i, selecting a plurality of second integers j, each second integer being uniquely distinct from each other second integer, and dividing each segment into points based on j; and calculating and outputting a discrete analogue of a random variable by applying an inverse function to a magnitude of a respective point, the discrete analogue simulating the noise.
 2. The process of claim 1, further including selecting a fourth parameter having a value C≧1, and calculating the magnitude of each point as ${s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot j}}},$ where i and j are respective first and second integers.
 3. The process of claim 1, further including selecting a fifth parameter having a value D≧1, and selecting i as D>i≧0, and selecting j as 2^(C)>j≧0.
 4. The process of claim 1, wherein the discrete analogue is calculated by selecting a value, associated with the random variable, which is closest to the inverse function of the respective point.
 5. The process of claim 1, including selecting a second parameter having a value A, a third parameter having a value B, a fourth parameter having a value C and a fifth parameter having a value D, wherein B≧0, 2^(B)>A>0, C≧1 and D≧1, calculating the first parameter having a value ${\alpha = \frac{2^{B} - A}{2^{B}}},$ selecting a value i for each first integer as D>i≧0, selecting a value j for each second integer as 2^(C)>j≧0, and calculating the magnitude of each point as $s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot {j.}}}$
 6. The process of claim 5, wherein the discrete analogue is calculated by selecting a value, associated with the random variable, which is closest to the inverse function of the respective point.
 7. The process of claim 5, wherein the segments are divided by iteratively defining, for each i having a value between D−2 and 0, a segment as [1−α^(i), 1−α^(i+1)], dividing the respective [1−α^(i), 1−α^(i+1)] segment into points based on j.
 8. The process of claim 7, further including defining, for i=D−1, a segment [1−α^(D−1),1], and calculating a magnitude for points in segment ${\left\lbrack {{1 - \alpha^{D - 1}},1} \right\rbrack\mspace{14mu}{as}\mspace{14mu} s_{{D - 1},j}} = {1 - \alpha^{D - 1} + {\alpha^{D - 1} \cdot \frac{1}{2^{C}} \cdot {j.}}}$
 9. A computer recordable medium having a computer readable and executable program embodied therein for addressing data to generate a noise simulator, the computer readable program comprising: first computer readable program code for causing a computer to define an interval containing a plurality of points such that neighboring points are separated by respective distances that vary over the interval, wherein the points are defined by computer readable program code for causing the computer to receive a plurality of first and second integers, each first integer being uniquely distinct from each other first integer and each second integer being uniquely distinct from each other second integer, computer readable program code for causing the computer to define a plurality of segments based on powers of a first parameter based on the first integer, and computer readable program code for causing the computer to divide each segment into points based on the second integer; second computer readable program code for causing the computer to calculate a magnitude for each point, wherein the second computer readable program code causes the computer to calculate the magnitude as, ${s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot j}}},$ where i and j are respective first and second integers, α is the first parameter and C is a parameter greater or equal to 1; and third computer readable program code for causing the computer to calculate and output a discrete analogue of a random variable by applying an inverse function to a magnitude of a respective point, the discrete analogue simulating noise.
 10. The computer recordable medium of claim 9, wherein the third computer readable program code includes computer readable program code for causing the computer to select a value, associated with the random variable, which is closest to the inverse function of the respective point.
 11. The computer recordable medium of claim 9, comprising: fifth computer readable program code for causing the computer to define a segment based on the first parameter and one of the first integers, sixth computer readable program code for causing the computer to divide the segment into points based on respective ones of the second integers, seventh computer readable program code for causing the computer to calculate a magnitude for each point of the segment, and eighth computer readable program code for causing the computer to iteratively repeat execution of the fifth, sixth and seventh computer readable codes for each additional first integer.
 12. The computer recordable medium of claim 9, including computer readable program code responsive to parameters A and B for causing the computer to calculate the first parameter having a value ${\alpha = \frac{2^{B} - A}{2^{B}}},$ where B≧0, 2^(B)>A>0, computer readable program code for causing the computer to select a value i for each first integer as D>i≧0, where D≧1, computer readable program code for causing the computer to select a value j for each second integer as 2^(C)>j≧0, and computer readable program code for causing the computer to calculate the magnitude as $s_{i,j} = {1 - \alpha^{i} + {\alpha^{i} \cdot \frac{1 - \alpha}{2^{C}} \cdot j}}$ for values of i between D−2 and 0 or as $s_{{D - 1},j} = {1 - \alpha^{D - 1} + {\alpha^{D - 1} \cdot \frac{1}{2^{C}} \cdot j}}$ for i=D−1. 